VARIATIONAL PRINCIPLES OF THE THEORY OF CONFORMAL MAPPING

1.1. The principles of Lindelöf and Montel

Let there be given in the plane of the complex variable z two simply connected regions D and [??], bounded by curves Γ and [??], and let w = f(z) and w = [??](z) be functions which map the regions D and D on to one of the standard regions: circle, half-plane or strip. As supplementary conditions which determine the mapping uniquely let us require that for [??] [equivalent to] Γ we have [??] [equivalent to] f.

At the basis of the application of variational methods to the theory of functions of a complex variable or to problems of mechanics which can be solved by the methods of this theory we have the following problem.

Assuming w = f(z) to be known and [??] to be infinitely close to Γ find the variation of f(z), i.e., the principal linear part of the variation of f(z) as Γ -> [??].

We will consider the cases of mappings on to the circle, half-plane and strip separately for the corresponding, most frequently encountered normalisations.

1.1.1. The case of the circle. Let D = D(Γ) denote the simply connected region bounded by the line Γ. Select in D some fixed point z0 and map D conformally on to the unit circle [absolute value of w< 1 so that the point z0 corresponds to the point w = 0:

[w = f(z, Γ), f(z0, Γ) = 0. (1.1)

There will be infinitely many functions having this property, but all of them will differ by factors eiθ, where θ is an arbitrary, real number. The multiplier eiθ will not play any role in what follows and we will understand by f any function of this class.

We will denote the closed curve corresponding to the transformation (1.1) to the circle [absolute value of w] = r< 1 by γr; on replacing Γ by [??], the corresponding function f and curve γr will be denoted by [??] and [??]r, respectively.

Consider the polar coordinate system r, φ with the pole at the point z0 and assume that in this system of coordinates the radii r and [??] of the points of Γ and [??] are single-valued functions of φ (i.e., the regions D(Γ) and D([??]) form rings around z0). We will call the points z1 = r1eiθ1 of the contour Γ, at which λ = = r(φ)/[??](φ) attains a maximum and z2 = r2eiθ2 where λ attains a minimum points of largest deformation of Γ (with respect to z0); the corresponding numbers λ1 and λ2 will be called upper and lower bounds of deformation.

We will now formulate

Theorem 1.1 (Lindelöf's principle). If the region D([??]) is contained